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$G_{δ}$ -separation axioms in ordered fuzzy topological spaces

Elango Roja, Mallasamudram Kuppusamy Uma, Ganesan Balasubramanian (2007)

Kybernetika

$G_{δ}$ -separation axioms are introduced in ordered fuzzy topological spaces and some of their basic properties are investigated besides establishing an analogue of Urysohn’s lemma.

Galois correspondences for closed classes of functions with delay. I.

Miličić, M.I. (1984)

Publications de l'Institut Mathématique. Nouvelle Série

Galois coverings and the problem of axiomatization of the representation type of algebras.

Stanislaw Kasjan, José Antonio de la Peña (2005)

Extracta Mathematicae

Game properties of Boolean algebras

Peter Vojtáš (1983)

Commentationes Mathematicae Universitatis Carolinae

Games with creatures

Saharon Shelah, Jindřich Zapletal (2003)

Commentationes Mathematicae Universitatis Carolinae

Many forcing notions obtained using the creature technology are naturally connected with certain integer games.

Ganzgeschlossene und prädikatgeschlossene Logiken I.

Jörg Flum (1971)

Archiv für mathematische Logik und Grundlagenforschung

Ganzgeschlossene und prädikatgeschlossene Logiken II.

Jörg Flum (1971)

Archiv für mathematische Logik und Grundlagenforschung

Gaps in analytic quotients

Stevo Todorčević (1998)

Fundamenta Mathematicae

We prove that the quotient algebra P(ℕ)/I over any analytic ideal I on ℕ contains a Hausdorff gap.

Garnir's dream spaces with Hamel bases.

Norbert Brunner (1987)

Archiv für mathematische Logik und Grundlagenforschung

Gaussian Integers

Yuichi Futa, Hiroyuki Okazaki, Daichi Mizushima, Yasunari Shidama (2013)

Formalized Mathematics

Gaussian integer is one of basic algebraic integers. In this article we formalize some definitions about Gaussian integers [27]. We also formalize ring (called Gaussian integer ring), Z-module and Z-algebra generated by Gaussian integer mentioned above. Moreover, we formalize some definitions about Gaussian rational numbers and Gaussian rational number field. Then we prove that the Gaussian rational number field and a quotient field of the Gaussian integer ring are isomorphic.

General fuzzy decision systems

Jiří Močkoř (1997)

Acta Mathematica et Informatica Universitatis Ostraviensis

General operators binding variables in the interpreted modal calculus $\mathcal{MC}^{\nu}$

Aldo Bressan, Alberto Zanardo (1981)

Atti della Accademia Nazionale dei Lincei. Classe di Scienze Fisiche, Matematiche e Naturali. Rendiconti Lincei. Matematica e Applicazioni

Si considera il calcolo modale interpretato $\mathcal{MC}^{\nu}$ , che è basato su un sistema di tipi con infiniti livelli, contiene descrizioni, ed è dotato di una semantica di tipo generale - v. [2], o [3], o [4], o [5]. In modo semplice e naturale si introducono in $\mathcal{MC}^{\nu}$ operatori vincolanti variabili, di tipo generale. Per teorie basate sul calcolo logico risultante $\mathcal{MC}^{\nu}$ vale un teorema di completezza, che si dimostra in modo immediato sulla base dell'estensione del teorema parziale di completezza stabilito in [11], fatta...

Generalisations of $ε$ -density

Mirna Džamonja, Grzegorz Plebanek (2003)

Acta Universitatis Carolinae. Mathematica et Physica

Generalization of some known properties of Cantor set

Dilip Kumar Ganguly (1978)

Czechoslovak Mathematical Journal

Generalization of the concept of variety and quasivariety to partial algebras through category theory [Book]

H. Andréka, I. Németi (1983)

Generalizations of Boolean algebras. An attribute exploration

Léonard Kwuida, Christian Pech, Heiko Reppe (2006)

Mathematica Slovaca

Generalizations of pseudo MV-algebras and generalized pseudo effect algebras

Jan Kühr (2008)

Czechoslovak Mathematical Journal

We deal with unbounded dually residuated lattices that generalize pseudo $M V$ -algebras in such a way that every principal order-ideal is a pseudo $M V$ -algebra. We describe the connections of these generalized pseudo $M V$ -algebras to generalized pseudo effect algebras, which allows us to represent every generalized pseudo $M V$ -algebra $A$ by means of the positive cone of a suitable $ℓ$ -group $G_{A}$ . We prove that the lattice of all (normal) ideals of $A$ and the lattice of all (normal) convex $ℓ$ -subgroups of $G_{A}$ are isomorphic....

Generalized Archimedean fields and logics with Malitz quantifiers

J. Cowles (1981)

Fundamenta Mathematicae

Generalized Choquet spaces

Samuel Coskey, Philipp Schlicht (2016)

Fundamenta Mathematicae

We introduce an analog to the notion of Polish space for spaces of weight ≤ κ, where κ is an uncountable regular cardinal such that $κ^{< κ} = κ$ . Specifically, we consider spaces in which player II has a winning strategy in a variant of the strong Choquet game which runs for κ many rounds. After discussing the basic theory of these games and spaces, we prove that there is a surjectively universal such space and that there are exactly $2^{κ}$ many such spaces up to homeomorphism. We also establish a Kuratowski-like...

Generalized convexities related to aggregation operators of fuzzy sets

Susana Díaz, Esteban Induráin, Vladimír Janiš, Juan Vicente Llinares, Susana Montes (2017)

Kybernetika

We analyze the existence of fuzzy sets of a universe that are convex with respect to certain particular classes of fusion operators that merge two fuzzy sets. In addition, we study aggregation operators that preserve various classes of generalized convexity on fuzzy sets. We focus our study on fuzzy subsets of the real line, so that given a mapping $F : [0, 1] \times [0, 1] \to [0, 1]$ , a fuzzy subset, say $X$ , of the real line is said to be $F$ -convex if for any $x, y, z \in ℝ$ such that $x \leq y \leq z$ , it holds that $μ_{X} (y) \geq F (μ_{X} (x), μ_{X} (z))$ , where $μ_{X} : ℝ \to [0, 1]$ stands here for the membership function...

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